- categories: Linear algebra, Definition
A linear map (or linear transformation) is a function between two vector spaces and over the same field (typically or ) that preserves vector addition and scalar multiplication.
Definition
A function is linear if, for all and scalars (or ):
- Additivity: ,
- Homogeneity: .
Key Properties
- Zero Map: , since .
- Linearity of Composition: If is also linear, then is linear.
- Matrix Representation: If and are finite-dimensional, can be represented as a Matrix that describes its action in terms of basis vectors.
Examples
- Scaling: for a fixed scalar is linear.
- Differentiation: is a linear map from the space of differentiable functions to itself.